\displaystyle{\left(-\infty,{2}\right]} Explanation: In any square root function, the "argument" of the square root, or the thing inside the square root function, must be greater than \displaystyle{0} ...

The domain is \displaystyle{\left(-\infty,\frac{{5}}{{2}}\right]} . The range is \displaystyle{y}\in{\left[{0},+\infty\right)} Explanation: What's under the square root sign is \displaystyle\ge{0} ...

.Reverse x-axis by \displaystyle{x}\to-{x} , apply the scalar multiple 2 and shift the origin to (0, -8). In brief, \displaystyle{\left({x},{y}\right)}\to{\left(-{2}{x},{y}+{8}\right)} ...

First, lets define f(x) as y=\sqrt{6-x} and g(x) as y=x If we plug in x=-3 then g(x)=-3 while f(x)=\sqrt{6-(-3)}=\sqrt{6+3}=\sqrt{9}=3, so f(x)=3 \neq -3=g(x), thus ...

Range \displaystyle\to{y}\in{\left[{0},-\infty\right)} Domain \displaystyle\to{x}\in{\left[-{1},+\infty\right)} Explanation: For the solution not to enter the domain of complex numbers the ...

Most important point is when \displaystyle{y}={0} Explanation: This happens when \displaystyle{x}=-{2}\to{\left(-{2},{0}\right)} \displaystyle{x}\ge-{2} otherwise the argument would ...